Optimal Intersection Curves for Surfaces

In this article, an algorithm has been established to approximate parametric-parametric, explicit-implicit, and explicit-explicit surface intersection. Foremost, it extracts the characteristic points (boundary and turning points) from the sequence of intersection points and fits an optimal cubic spline curve to these points. Moreover, this paper utilizes genetic algorithm (GA) for optimization of shape parameters in the portrayal of cubic spline so that the error is minimal. The proposed algorithm is demonstrated with different types of surfaces to analyze its robustness and proficiency. In the end, all illustrations show the effectiveness of the algorithm which makes it more influential to resolve all complexities arises during intersection with a minimal error.

[1]  Tae-wan Kim,et al.  Approximation of surface-to-surface intersection curves within a prescribed error bound satisfying G2 continuity , 2009, Comput. Aided Des..

[2]  F. Fang,et al.  A smooth tool path planning method on NURBS surface based on the shortest boundary geodesic map , 2020 .

[3]  I. Silambarasan Generalized orthopair fuzzy sets based on Hamacher T-norm and T-conorm , 2021 .

[4]  Nassar H. Abdel-All,et al.  Intersection curves of hypersurfaces in R4 , 2012, Comput. Aided Geom. Des..

[5]  Tae-wan Kim,et al.  Classification and resolution of critical cases in Grandine and Klein's topology determination using a perturbation method , 2009, Comput. Aided Geom. Des..

[6]  Sayed Abdel-Naeim Badr,et al.  Intersection Curves of Implicit and Parametric Surfaces in R3 , 2011 .

[7]  H. Mukundan,et al.  Tracing surface intersections with validated ODE system solver , 2004, SM '04.

[8]  D. Ritelli,et al.  Trinomial equation: the Hypergeometric way , 2021 .

[9]  Tamás Várady,et al.  Constrained fitting with free-form curves and surfaces , 2020, Comput. Aided Des..

[10]  Muhammad Sarfraz,et al.  A Novel Approach for Surface to Surface Intersection Approximation , 2013, 2013 17th International Conference on Information Visualisation.

[11]  Deane Roehl,et al.  A 3D sketch-based formulation to model salt bodies from seismic data , 2020, Comput. Geosci..

[12]  D. Ritelli,et al.  The Lambert function, the quintic equation and the proactive discovery of the Implicit Function Theorem , 2021 .

[13]  Anikó Ekárt,et al.  Genetic algorithms in computer aided design , 2003, Comput. Aided Des..

[14]  Nicholas M. Patrikalakis,et al.  Surface to Surface Intersections , 2004 .